Method, system and medium for controlling manufacture process having multivariate input parameters

ABSTRACT

A method, system, and medium of modeling and/or for controlling a manufacturing process is disclosed. In particular, a method according to embodiments of the present invention includes the step of identifying one or more input parameters. Each input parameter causes a change in at least two outputs. The method also includes the step of storing values of the identified inputs and corresponding empirical output values along with predicted output values. The predicted output values are calculated based on, in part, the values of the identified inputs. The method also includes the step of calculating a set of transform coefficients by minimizing a score equation that is a function of differences between one or more of the empirical output values and their corresponding predicted output values. The method further includes the steps of receiving a new set of values for the identified inputs, transforming the new set of values for the identified input using the set of coefficients, and calculating a set of predicted output values using the transformed input values.

RELATED APPLICATION

This application claims priority from U.S. Provisional Application No. 60/426,393, filed Nov. 15, 2002, which is incorporated herein by reference.

FIELD OF THE INVENTION

The present invention relates to a method, system and medium for modeling and controlling processes. More specifically, the present invention relates to modeling and controlling semiconductor-processing equipment that has multivariate input parameters.

BACKGROUND OF THE INVENTION

In manufacturing products that include precision discrete parts (e.g., microelectronic chips on silicon substrates), controlling manufacturing processes plays a crucial role. Controlling such processes may require, among other things, monitoring the characteristics of manufactured parts (e.g., processed wafers, hereinafter referred to as outputs) and adjusting input parameters accordingly. By adjusting the values of the input parameters, different types of outputs can be produced and the characteristics of the outputs can also be controlled.

For automating the control of the manufacturing processes, a mathematical model of the processing equipment can be used. One example of such a model is called a predictive model. This model is used to predict the future output values (e.g., the characteristics of products) based on historical information (e.g., input parameter values and the corresponding output qualities).

One such predictive model is an offset technique, which is illustrated in FIG. 1. In particular, the values of a number of input parameters 101 are received by an input/output dependency model 103, which calculates a predicted output value y₁ ^(Pred) 105 based on the input values. A corrector 109 then compares the predicted value y₁ ^(Pred) with an actual output value y₁ ^(a) 107 for the given values of the input parameters. If the predicted and actual output values are similar to each other within a certain range, no change is made to the input/output dependency model 103. If the predicted and actual output values are different (e.g., outside the range) from each other, the predictor input/output dependency model 103 is modified by adjusting an offset value (O₁) 111 based on the magnitude of the difference.

In equipment that has more than one output, at least some of the outputs may include mutual (shared) inputs. This means the output values of the equipment are not completely independent from each other (e.g., changing an input to adjust a given output may unintentionally change the characteristics of other outputs). In a conventional modeling technique, each output has its own correction system as if the output values are independent from each other. Because the dependencies between the different outputs are not accounted for by the conventional technique, it does not always lead to accurate predictions. In addition, adjusting one offset of one output can affect other outputs.

SUMMARY OF THE INVENTION

Embodiments of the present invention advantageously overcome the above-described shortcomings of the aforementioned techniques. More specifically, embodiments of the present invention provide a system, method and medium for controlling semiconductor-processing equipment that has multivariate input parameters and outputs.

Embodiments of the present invention minimize the effects of outputs being interdependent from each other. This is achieved by providing input parameter transformations having transformation coefficients. The coefficients are obtained by minimizing a score function. This, in turn, allows accurate models to be obtained. Using the models, highly precise control of manufacturing equipment is accomplished.

In particular, an example method according to embodiments of the present invention includes the steps of identifying at least one input that causes a change in at least two of a plurality of outputs, storing values of the identified inputs and corresponding empirical output values, and calculating and storing predicted output values, based on, in part, the values of the identified inputs. The example method may further include the steps of calculating a set of transform coefficients by minimizing a score equation that is a function of, in part, differences between one or more of the empirical output values and their corresponding predicted output values, and calculating one or more input values for one or more desired output values based on, in part, the calculated set of transform coefficients.

BRIEF DESCRIPTION OF THE DRAWINGS

The detailed description of the present application showing various distinctive features may be best understood when the detailed description is read in reference to the appended drawings in which:

FIG. 1 is a diagram showing a conventional offset model;

FIG. 2 is a diagram illustrating processing equipment;

FIG. 3 is a diagram illustrating a model of the processing equipment shown in FIG. 2 in accordance with embodiments of the present invention;

FIG. 4 is a block diagram illustrating various components of embodiments of the present invention;

FIG. 5 is a flow chart illustrating processing steps of embodiments of the present invention;

FIG. 6 is a diagram illustrating a CMP process;

FIG. 7 is a block diagram representation of an example embodiment of a computer configured to perform embodiments of the present invention; and

FIG. 8 is a diagram illustrating an example of a memory medium that can be used for storing computer programs of embodiments of the present invention.

DETAILED DESCRIPTION

Embodiments of the present invention generally provide systems, methods and mediums for creating one or more adaptive process models to mathematically represent multivariate input parameter systems. The present invention is particularly applicable in a manufacturing process such as manufacturing and/or processing semiconductor wafers. In particular, the present invention relates to modeling techniques as used by equipment involved in the manufacturing of semiconductor wafers. A general overview of embodiments of the present invention is provided below. It will be followed by a specific example implementation of the present invention.

Before discussing embodiments of the present invention, FIG. 2 shows a simplified graphical representation of processing equipment 205 with input parameters 201 and outputs 203. Examples of processing equipment include etcher tools, deposition tools, chemical mechanical planarization (CMP) tools, etc. The processing equipment 205 can include one or more tools. Depending upon the values of the input parameters 201, different processes can be achieved. For instance, in a deposition tool, different types of layers can be deposited on a wafer and/or the thickness of the layer can be varied.

As a general overview of embodiments of the present invention, in FIG. 3, the processing equipment 205 has a set of input parameters 301, a set of predicted outputs 303, and a prediction model 305 therebetween (replacing the processing equipment of FIG. 2). The overall goal of the prediction model is to minimize differences between the predicted output values and empirically collected output values (i.e., the actual output values). Once the prediction model is optimized (e.g., the differences between the predicted and actual output values have been minimized), the model can then be used in setting input parameters based on desired output values. In other words, for a given set of desired output values, the model can be used in a reverse fashion to calculate the input parameter values that would cause output values close to the desired output values. The calculated input parameter values are also known as recipes.

In embodiments of the present invention, the step of obtaining the predictive model can be divided into two steps. The first is to transform the values of the input parameters 301 into transformed input values 307. The second is to use the transformed input values 307 in calculating predicted output values 303.

With respect to the transformation, input parameter values (X₁,X₂,X₃) along with coefficient vector {right arrow over (P)} are transformed into (X′₁,X′₂, and X′₃) by transform functions ψ₁, ψ₂, and ψ₃. Examples of transformation functions include:

-   1) X′₁=PX₁; X′₂=PX₂ (In this example, the value of {right arrow over     (P)} is identical for both X1 and X2.) -   2) X′₁=P₁₁X₁+P₁₂X₁ ²; X′₂=P₂₁X₁+P₂₂X₂ ²+P_(cross) X₁ X₂ (In this     example, P₁₁, P₁₂, P₂₁, P₂₂ and P_(cross) can have different     values.)

The coefficient values are calculated by the steps of: a. collecting historical information on input parameter values and actual output values; b. creating a score function based on the collected information; and c. finding the coefficient values that minimize the score function, S_(p).

The above steps are described by making references to semiconductor processing tools. As such, the step of collecting the historical information entails a set of data points for processing a number of wafers. In particular, input parameter values and actual output values for a number of wafers that have been processed by the processing equipment would be collected. This collection would then be used in the next step of minimizing the score function.

Here, the score function, S_(p), is:

$S_{p} = {\sum\limits_{i,k}{W_{i,k}\left( {y_{actual}^{i\; k} - {y_{predicted}^{i\; k}\left( {{\overset{\rightarrow}{X}}^{{i\;}^{\prime}}\left( {{\overset{\rightarrow}{X}}^{i},\overset{\rightarrow}{P}} \right)} \right)}} \right)}^{2}}$ where:

-   i—number of wafer; -   k—number of output; -   y_(actual)—an actual output value; -   y_(predicted)—a predicted output value, as calculated based on     transformed inputs for a particular wafer i ({right arrow over     (X)}^(i′)); -   {right arrow over (X)}^(i′)=(X₁ ^(i′),X₂ ^(i′),X₃ ^(i′)) is the     transformed input vector, calculated on the base of the actual     input; and {right arrow over (X)}^(i)=(X₁ ^(i),X₂ ^(i),X₃ ^(i)) for     wafer i together with the transformation parameters {right arrow     over (P)}. This calculation is performed using the following     transformation functions:     ψ₁(X₁,X₂,X₃,{right arrow over (P)}): ψ₂(X₁,X₂,X₃,{right arrow over     (P)}); and ψ₃(X₁,X₂,X₃,{right arrow over (P)}).     The next step, as noted above, is to minimize the score S_(p), i.e.,     to find {right arrow over (P)} values that provide the minimum of

$S_{p}\left( {S_{p}\underset{p}{\longrightarrow}\min} \right)$

The above-described steps calculate an optimal {right arrow over (P)} (i.e., a vector of coefficients for input transformation functions) such that the prediction model of the present invention provides the closest possible predicted outputs to the actual outputs. In a processing model with multivariate input parameters, when the score is minimized, the negative effect of the interdependencies between output values on the model accuracy would also be minimized.

Now turning to describe an example implementation of the embodiments described above, as shown in FIG. 4, the example implementation includes a number of components: an input transformer 401, an input-output dependency model 403, a corrector 405 and a storage device 407. All these components can be implemented in hardware, firmware, software and/or any combination thereof.

These components are further explained by also referring to FIG. 5. In particular, the historical information (i.e., y_(a) ^(ik),{right arrow over (X)}^(i)) is stored into the storage device 407. The corrector 405 then retrieves the historical information (y_(a) ^(ik), {right arrow over (X)}^(i)) from the storage device 407 (step 501). Since the retrieved historical information contains raw input parameter values, the information is sent to the input transformer 401 along with coefficients {right arrow over (P)} (step 503). The coefficient {right arrow over (P)} can be stored in the storage device 407 or in the corrector 405.

The input transformer 401, upon receiving the information from the corrector 405, calculates transformed input parameter values {right arrow over (X)}^(i′) (step 505). Once the transformed input parameter values are calculated, the input transformer 401 sends the transformed input values to the corrector 405.

The corrector 405, upon receiving the transformed input parameter values from the input transformer 401, sends the transformed input parameter values to the input/output dependence model 403. The input/output dependency model 403 then calculates predicted output parameter values y_(pred) (step 507). The corrector 405 then calculates the score S_(p), and sets a new {right arrow over (P)} (a vector of parameters of input transformation functions) in order to minimize the score S_(p) (step 509). These steps can be repeated until an optimum {right arrow over (P)} that yields a minimal score S_(p) is obtained, and return the optimum {right arrow over (P)}. Each time new data is obtained, a new score from new data is created and a new optimum {right arrow over (P)} value is calculated. This newly calculated vector {right arrow over (P)} could be used for transforming the input values, meaning: {right arrow over (P)}_(new)≡{right arrow over (P)}_(optimum).

In embodiments of the present invention, the optimum coefficients can be combined with the most recent vector such that: {right arrow over (P)}_(new)≡{right arrow over (P)}_(previous)+K({right arrow over (P)}_(optimum)−{right arrow over (P)}_(previous)) wherein K<1.

As a new set of data points arrives, a new optimum {right arrow over (P)} can be recalculated.

Once a set of coefficients is calculated, a set of input values can be obtained (e.g., a recipe) for a desired set of output values. More specifically, from a set of desired values, a set of transformed input values, {right arrow over (X)}^(i′), can be obtained by reversing the predictive model (e.g., the input/output dependence model 403). The transformed input values can then be reverse transformed using the coefficients {right arrow over (P)} to obtain the input value to produce the desired output values.

In the above-described embodiments, the raw input values are transformed using the calculated coefficients. The transformation is required to account for the dependencies among input parameters as graphically illustrated in FIG. 6. More specifically, a surface of a wafer having five regions with varying degrees of roughness is to be polished by a CMP process. The goal is to achieve a flat surface depicted by a dotted line in FIG. 6. In conventional techniques, one region would be polished without regard to the other regions. However, polishing one region can affect the polishing of another region (e.g., when an offset is applied in region 1 in order to bring the height in region 1 down to the broken line, the height in region 2 is also influenced by the changes of region 1). Using the embodiments of the present invention, these dependencies are accounted for.

An example embodiment of the computer in which embodiments of the present invention operate (e.g., the various components described in FIG. 4) is described below in connection with FIGS. 7-8. FIG. 7 illustrates a block diagram of one example of the internal hardware 713 of a computer configured to perform embodiments of the present invention. A bus 756 serves as the main information highway interconnecting various components therein. CPU 758 is the central processing unit of the internal hardware 713, performing calculations and logic operations required to execute embodiments of the present invention as well as other programs. Read only memory (ROM) 760 and random access memory (RAM) 762 constitute the main memory. Disk controller 764 interfaces one or more disk drives to the system bus 756. These disk drives are, for example, floppy disk drives 770, or CD ROM or DVD (digital video disks) drives 766, or internal or external hard drives 768. These various disk drives and disk controllers are optional devices.

A display interface 772 interfaces display 748 and permits information from the bus 756 to be displayed on display 748. Communications with external devices, such as the other components of the system described above, occur utilizing, for example, communication port 774. Optical fibers and/or electrical cables and/or conductors and/or optical communication (e.g., infrared, and the like) and/or wireless communication (e.g., radio frequency (RF), and the like) can be used as the transport medium between the external devices and communication port 774. Peripheral interface 754 interfaces the keyboard 750 and mouse 752, permitting input data to be transmitted to bus 756. In addition to these components, the internal hardware 713 also optionally includes an infrared transmitter and/or infrared receiver. Infrared transmitters are optionally utilized when the computer system is used in conjunction with one or more of the processing components/stations/modules that transmit/receive data via infrared signal transmission. Instead of utilizing an infrared transmitter or infrared receiver, the computer system may also optionally use a low power radio transmitter 780 and/or a low power radio receiver 782. The low power radio transmitter transmits the signal for reception by components of the production process, and receives signals from the components via the low power radio receiver. The low power radio transmitter and/or receiver are standard devices in industry.

Although the computer in FIG. 7 is illustrated having a single processor, a single hard disk drive and a single local memory, the analyzer is optionally suitably equipped with any multitude or combination of processors or storage devices. For example, the computer may be replaced by, or combined with, any suitable processing system operative in accordance with the principles of embodiments of the present invention, including sophisticated calculators, and hand-held, laptop/notebook, mini, mainframe and super computers, as well as processing system network combinations of the same.

FIG. 8 is an illustration of an example computer readable memory medium 884 utilizable for storing computer readable code or instructions. As one example, medium 884 may be used with disk drives illustrated in FIG. 7. Typically, memory media such as floppy disks, or a CD ROM, or a digital video disk will contain, for example, a multi-byte locale for a single byte language and the program information for controlling the modeler to enable the computer to perform the functions described herein. Alternatively, ROM 760 and/or RAM 762 illustrated in FIG. 7 can also be used to store the program information that is used to instruct the central processing unit 758 to perform the operations associated with various automated processes of the present invention. Other examples of suitable computer readable media for storing information include magnetic, electronic, or optical (including holographic) storage, some combination thereof, etc.

In general, it should be emphasized that the various components of embodiments of the present invention can be implemented in hardware, software or a combination thereof. In such embodiments, the various components and steps would be implemented in hardware and/or software to perform the functions of embodiments of the present invention. Any presently available or future developed computer software language and/or hardware components can be employed in such embodiments of the present invention. For example, at least some of the functionality mentioned above could be implemented using Visual Basic, C, C++, or any assembly language appropriate in view of the processor(s) being used. It could also be written in an interpretive environment such as Java and transported to multiple destinations to various users.

The many features and advantages of embodiments of the present invention are apparent from the detailed specification, and thus, it is intended by the appended claims to cover all such features and advantages of the invention which fall within the true spirit and scope of the invention. Further, since numerous modifications and variations will readily occur to those skilled in the art, it is not desired to limit the invention to the exact construction and operation illustrated and described, and accordingly, all suitable modifications and equivalents may be resorted to, falling within the scope of the invention. For instance, output values can be transformed similar to the transform performed on the input parameters, and operations can be performed on the transformed output values similar to those performed on the transformed input parameters. 

1. A computer implemented method for controlling a manufacturing apparatus, the method comprising: (a) identifying at least one input, the at least one input causing a change in at least two of a plurality of outputs; (b) storing values of the identified inputs and corresponding empirical output values along with predicted output values, wherein the predicted output values are calculated based on, in part, the values of the identified inputs; (c) calculating a set of transform coefficients by minimizing a score equation that is a function of, in part, differences between one or more of the empirical output values and their corresponding predicted output values, wherein the score equation is: $S_{p} = {\sum\limits_{i,k}{W_{i,k}\left( {y_{actual}^{i\; k} - {y_{predicted}^{i\; k}\left( {{\overset{\rightarrow}{X}}^{{i\;}^{\prime}}\left( {{\overset{\rightarrow}{X}}^{i},\overset{\rightarrow}{P}} \right)} \right)}} \right)}^{2}}$ where: i—number of wafer; k—number of output; y_(actual)—an empirical output value; y_(predicted)—a predicted output value, as calculated based on transformed inputs for a particular wafer i ({right arrow over (X)}^(i′)) {right arrow over (X)}^(i′)=(X₁ ^(i′),X₂ ^(i′),X₃ ^(i′)) is transformed input values in a vector format; ({right arrow over (X)}^(i′))=(X₁ ^(i′),X₂ ^(i′),X₃ ^(i′)) for wafer i together with the transformation parameters ({right arrow over (P)}), to thereby calculate an optimal value of P; (d) calculating one or more input values for one or more desired output values based on, in part, the calculated set of transform coefficients; and (e) communicating the transformed input values of (d) to a manufacturing apparatus.
 2. The method of claim 1, further comprising; collecting additional empirical data and corresponding input values; calculating a new set of coefficients {right arrow over (P)}_(new) ; and using the new set of coefficients as the optimal value of {right arrow over (P)}.
 3. The method of claim 1 further comprising; collecting additional empirical data and corresponding input values; calculating a new set of coefficients as {right arrow over (P)}_(new)≡{right arrow over (P)}_(previous)+K({right arrow over (P)}_(optimum)−{right arrow over (P)}_(previous)), wherein K<1 and {right arrow over (P)}_(previous) is a previously calculated optimal value of {right arrow over (P)}; and using the new set of coefficients as the optimal value of {right arrow over (P)}.
 4. A computer implemented system for controlling a manufacturing apparatus, the system comprising: (a) means for identifying at least one input, the at least one input causing a change in at least two of a plurality of outputs; (b) a memory device configured to store values of the identified inputs and corresponding empirical output values along with predicted output values, wherein the predicted output values are calculated based on, in part, the values of the identified inputs; (c) means for calculating a set of transform coefficients by minimizing a score equation that is a function of, in part, differences between one or more of the empirical output values and their corresponding predicted output values, wherein the score equation is: $S_{p} = {\sum\limits_{i,k}{W_{i,k}\left( {y_{actual}^{i\; k} - {y_{predicted}^{i\; k}\left( {{\overset{\rightarrow}{X}}^{{i\;}^{\prime}}\left( {{\overset{\rightarrow}{X}}^{i},\overset{\rightarrow}{P}} \right)} \right)}} \right)}^{2}}$ where: i—number of wafer; k—number of output; y_(actual)—an empirical output value; y_(predicted)—a predicted output value, as calculated based on transformed inputs for a particular wafer i ({right arrow over (X)}^(i′)) {right arrow over (X)}^(i′)=(X₁ ^(i′),X₂ ^(i′),X₃ ^(i′)) is transformed input values in a vector format; {right arrow over (X)}^(i)=(X₁ ^(i),X₂ ^(i),X₃ ^(i)) for wafer i together with the transformation parameters {right arrow over (P)}, to thereby calculate an optimal value of {right arrow over (P)}; (d) means for calculating one or more input values for one or more desired output values based on, in part, the calculated set of transform coefficients; and (e) means for communicating the transformed input values of (d) to a manufacturing apparatus.
 5. The system of claim 4, further comprising: means for collecting additional empirical data and corresponding input values; and means for calculating a new set of coefficients {right arrow over (P)}_(new), wherein the new set of coefficients is defined as the optimal value of {right arrow over (P)}.
 6. The system of claim 4, further comprising: means for collecting additional empirical data and corresponding input values; and means for calculating a new set of coefficients as {right arrow over (P)}_(new)≡{right arrow over (P)}_(previous)+K({right arrow over (P)}_(optimum)−{right arrow over (P)}_(previous)), wherein K<1 and {right arrow over (P)}_(previous) is a previously calculated optimal value of {right arrow over (P)}, wherein the new set of coefficients is defined as the optimal value of {right arrow over (P)}.
 7. A computer readable medium for storing instructions being executed by one or more computers, the instructions directing the one or more computers to perform a method for predicting output characteristics of a device produced by a manufacturing apparatus, the method comprising: (a) identifying at least one input, the at least one input causing a change in at least two of a plurality of outputs; (b) storing values of the identified inputs and corresponding empirical output values along with predicted output values, wherein the predicted output values are calculated based on, in part, the values of the identified inputs; (c) calculating a set of transform coefficients by minimizing a score equation that is a function of, in part, differences between one or more of the empirical output values and their corresponding predicted output values, wherein the score equation is: $S_{p} = {\sum\limits_{i,k}{W_{i,k}\left( {y_{actual}^{i\; k} - {y_{predicted}^{i\; k}\left( {{\overset{\rightarrow}{X}}^{{i\;}^{\prime}}\left( {{\overset{\rightarrow}{X}}^{i},\overset{\rightarrow}{P}} \right)} \right)}} \right)}^{2}}$ where: i—number of wafer; k—number of output; y_(actual)—an empirical output value; y_(predicted)—a predicted output value, as calculated based on transformed inputs for a particular wafer i ({right arrow over (X)}^(i′)) {right arrow over (X)}^(i′)=(X₁ ^(i′),X₂ ^(i′),X₃ ^(i′)) is transformed input values in a vector format; {right arrow over (X)}^(i)=(X₁ ^(i),X₂ ^(i),X₃ ^(i)) for wafer i together with the transformation parameters {right arrow over (P)}, to thereby calculate an optimal value of {right arrow over (P)}; (d) calculating one or more input values for one or more desired output values based on, in part, the calculated set of transform coefficients; and (e) communicating the transformed input values of (d) to a manufacturing apparatus.
 8. The medium of claim 7, wherein the method further comprises: collecting additional empirical data and corresponding input values; calculating a new set of coefficients {right arrow over (P)}_(new); and using the new set of coefficients as the optimal value of {right arrow over (P)}.
 9. The medium of claim 7, wherein the method further comprises: collecting additional empirical data and corresponding input values; calculating a new set of coefficients as {right arrow over (P)}_(new)≡{right arrow over (P)}_(previous)+K({right arrow over (P)}_(optimum)−{right arrow over (P)}_(previous)), wherein K<1 and {right arrow over (P)}_(previous) is a previously calculated optimal value of {right arrow over (P)}; and using the new set of coefficients as the optimal value of {right arrow over (P)}.
 10. A computer implemented method for controlling a manufacturing apparatus, the method comprising: (a) identifying at least one input that causes a change in at least two of a plurality of outputs; (b) storing values of the identified inputs and corresponding empirical output values; (c) calculating and storing predicted output values, based on, in part, the values of the identified inputs; (d) calculating a set of transform coefficients by minimizing a score equation that is a function of, in part, differences between one or more of the empirical output values and their corresponding predicted output values; (e) calculating one or more input values for one or more desired output values based on, in part, the calculated set of transform coefficients; and (f) providing the transformed input values of (e) to a manufacturing apparatus.
 11. The method of claim 10, wherein the score function is: $S_{p} = {\sum\limits_{i,k}{W_{i,k}\left( {y_{actual}^{i\; k} - {y_{predicted}^{i\; k}\left( {{\overset{\rightarrow}{X}}^{{i\;}^{\prime}}\left( {{\overset{\rightarrow}{X}}^{i},\overset{\rightarrow}{P}} \right)} \right)}} \right)}^{2}}$ where: i—number of wafer; k—number of output; y_(actual)—an empirical output value; y_(predicted)—a predicted output value, as calculated based on transformed inputs for a particular wafer i ({right arrow over (X)}^(i′)) {right arrow over (X)}^(i′)=(X₁ ^(i′),X₂ ^(i′),X₃ ^(i′)) is transformed input values in a vector format; {right arrow over (X)}^(i)=(X₁ ^(i),X₂ ^(i),X₃ ^(i)) for wafer i together with the transformation parameters {right arrow over (P)}, to thereby calculate an optimal value of {right arrow over (P)}.
 12. The method of claim 10, further comprising: collecting additional empirical data and corresponding input values; calculating a new set of coefficients {right arrow over (P)}_(new); and using the new set of coefficients as the optimal value of {right arrow over (P)}.
 13. The method of claim 10 further comprising: collecting additional empirical data and corresponding input values; and calculating a new set of coefficients based on the additional empirical data.
 14. The method of claim 13, further comprising calculating the new set of coefficients using: {right arrow over (P)}_(new)≡{right arrow over (P)}_(previous)+K({right arrow over (P)}_(optimum)−{right arrow over (P)}_(previous)), wherein K<1 and {right arrow over (P)}_(previous) is a previously calculated optimal value of {right arrow over (P)}; and using the new set of coefficients as the optimal value of {right arrow over (P)}.
 15. A computer implemented system for controlling a manufacturing apparatus, the system comprising: (a) means for identifying at least one input that causes a change in at least two of a plurality of outputs; (b) a memory device configured to store values of the identified inputs and corresponding empirical output values along with predicted output values, wherein the predicted output values are calculated based on, in part, the values of the identified inputs; (c) means for calculating a set of transform coefficients by minimizing a score equation that is a function of, in part, differences between one or more of the empirical output values and their corresponding predicted output values; (d) means for calculating one or more input values for one or more desired output values based on, in part, the calculated set of transform coefficients; and (e) means for communicating the transformed input values of (d) to a manufactoring apparatus.
 16. The system of claim 15, wherein the score equation is: $S_{p} = {\sum\limits_{i,k}{W_{i,k}\left( {y_{actual}^{i\; k} - {y_{predicted}^{i\; k}\left( {{\overset{\rightarrow}{X}}^{{i\;}^{\prime}}\left( {{\overset{\rightarrow}{X}}^{i},\overset{\rightarrow}{P}} \right)} \right)}} \right)}^{2}}$ where: i—number of wafer; k—number of output; y_(actual)—an empirical output value; y_(predicted)—a predicted output value, as calculated based on transformed inputs for a particular wafer i ({right arrow over (X)}^(i′)) {right arrow over (X)}^(i′)=(X₁ ^(i′),X₂ ^(i′),X₃ ^(i′)) is transformed input values in a vector format; {right arrow over (X)}^(i)=(X₁ ^(i),X₂ ^(i),X₃ ^(i)) for wafer i together with the transformation parameters {right arrow over (P)}, to thereby calculate an optimal value of {right arrow over (P)}.
 17. The system of claim 15, further comprising: means for collecting additional empirical data and corresponding input values; and means for calculating a new set of coefficients {right arrow over (P)}_(new), wherein the new set of coefficients is defined as the optimal value of {right arrow over (P)}.
 18. The system of claim 15, further comprising: means for collecting additional empirical data and corresponding input values; and means for calculating a new set of coefficients based on the additional empirical data.
 19. The system of claim 18, wherein the means for calculating is further configured to use the following equation in calculating the new of coefficients: {right arrow over (P)}_(new)≡{right arrow over (P)}_(previous)+K({right arrow over (P)}_(optimum)−{right arrow over (P)}_(previous)), wherein K<1 and {right arrow over (P)}_(previous) is a previously calculated optimal value of {right arrow over (P)}, wherein the new set of coefficients is defined as the optimal value of {right arrow over (P)}.
 20. A computer readable medium for storing instructions being executed by one or more computers, the instructions directing the one or more computers to perform a method for predicting output characteristics of a device produced by a manufacturing apparatus, the method comprising: (a) identifying at least one input that causes a change in at least two of a plurality of outputs; (b) storing values of the identified inputs and corresponding empirical output values; (c) calculating and storing predicted output values, based on, in part, the values of the identified inputs; (d) calculating a set of transform coefficients by minimizing a score equation that is a function of, in part, differences between one or more of the empirical output values and their corresponding predicted output values; (e) calculating one or more input values for one or more desired output values based on, in part, the calculated set of transform coefficients; and (f) communicating the transformed input values of (d) to a manufacturing apparatus.
 21. The medium of claim 20, wherein the score function is: $S_{p} = {\sum\limits_{i,k}{W_{i,k}\left( {y_{actual}^{i\; k} - {y_{predicted}^{i\; k}\left( {{\overset{\rightarrow}{X}}^{{i\;}^{\prime}}\left( {{\overset{\rightarrow}{X}}^{i},\overset{\rightarrow}{P}} \right)} \right)}} \right)}^{2}}$ where: i—number of wafer; k—number of output; y_(actual)—an empirical output value; y_(predicted)—a predicted output value, as calculated based on transformed inputs for a particular wafer i ({right arrow over (X)}^(i′)) {right arrow over (X)}^(i′)=(X₁ ^(i′),X₂ ^(i′),X₃ ^(i′)) is transformed input values in a vector format; {right arrow over (X)}^(i)=(X₁ ^(i),X₂ ^(i),X₃ ^(i)) for wafer i together with the transformation parameters {right arrow over (P)}, to thereby calculate an optimal value of {right arrow over (P)}.
 22. The medium of claim 20, wherein the method further comprises: collecting additional empirical data and corresponding input values; calculating a new set of coefficients {right arrow over (P)}_(new); and using the new set of coefficients as the optimal value of {right arrow over (P)}.
 23. The medium of claim 20, wherein the method further comprises: collecting additional empirical data and corresponding input values; calculating a new set of coefficients as {right arrow over (P)}_(new)≡{right arrow over (P)}_(previous)+K({right arrow over (P)}_(optimum)−{right arrow over (P)}_(previous)), wherein K<1 and {right arrow over (P)}_(previous) is a previously calculated optimal value of {right arrow over (P)}; and using the new set of coefficients as the optimal value of {right arrow over (P)}. 